If you cannot see the pdf, here is a link to download it: Lecture Slides March 15
If you cannot see the pdf, here is a link to download it: Extra Review Solutions
If you cannot see the pdf, here is a link to download it: Lecture Slides March 15
If you cannot see the pdf, here is a link to download it: Extra Review Solutions
For your upcoming test:
In general, the best thing to do to study for this test is to review the examples from lecture and homework. The more practice you have, the better you’ll be able to handle the questions on the test!
I know all of you are thinking: Man! I’m totally going to miss finite math and all of these counting problems over spring break!
Well never fear! Here are some additional practice problems. Hand in these problems 5 minutes before class on Tuesday March 15 (or via email) to receive up to 10 extra credit points toward your quiz grade.
For the next two problems you will use the Binomial Theorem which says:
$latex (x+y)^n = C(n,0)x^n y^0 + C(n,1) x^{n-1}y^1 + C(n,2) x^{n-2}y^2 + \ldots + C(n,n) x^0 y^n$
So for example, $latex (x+y)^3 = x^3y^0 + 3x^2y + 3xy^2 + y^3$.
These practice problems are not in the text book:
The follow problems come from Section 5.6 of your text book:
Here are selected solutions for problems not in your text book:
Here’s a link to download: Selected solutions
If you cannot see the pdf, here is a link to download it: Quiz solution